If `(a+bx)/(a-bx) = (b+cx)/(b-cx) = (c+dx)/(c-dx) (x ne0)` then a, b, c, d are in

If (a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(x!=0) then show that a,b,c and d are in G.P.

(a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(x!=0) then show that a,b,c and d are in G.P.

Let f(x) = (ax +b)/(cx + d) (da-cb ne 0, c ne0) then f(x) has

If ax^3 + bx^2 + cx + d is divisible by ax^2 + c, then a, b, c, d are in (a) AP (b) GP (c) HP

If log_(x)ax,log_(x)bx" and "log_(x)cx are in AP, where a, b, c and x, belong to (1,oo) , then a, b and c are in

If "log"_(ax)x, "log"_(bx) x, "log"_(cx)x are in H.P., where a, b, c, x belong to (1, oo) , then a, b, c are in

If b-c , bx-cy , bx^(2)-cy^(2) ( b,c ne 0 ) are in G.P , then the value of ((bx+cy)/(b+c))((bx-cy)/(b-c)) is